Exact, Rotational, Infinite Energy, Blowup Solutions to the 3-Dimensional Euler Equations

Abstract

In this paper, we construct a new class of blowup solutions with elementary functions to the 3-dimensional compressible or incompressible Euler and Navier-Stokes equations. In detail, we obtain a class of global rotational exact solutions for the compressible fluids with γ>1:% [c]c% =\γ-1Kγ[ C2[ x2% +y2+z2-(xy+yz+xz)] -a(t)(x+y+z)+b(t)], 0\ 1γ-1 u1=a(t)+C(y-z) u2=a(t)+C(-x+z) u3=a(t)+C(x-y). where a(t)=c0+c1t and b(t)=3c0c1t+3/2c12t2+c2% with C, c0, c1 and c2 are arbitrary constants; And the corresponding blowup or global solutions for the incompressible Euler equations are also given. Our constructed solutions are similar to the famous Arnold-Beltrami-Childress (ABC) flow. The solutions with infinite energy can exhibit the interesting behaviors locally. Besides, the corresponding global solutions are also given for the compressible Euler equations. Furthermore, due to divu=0 for the solutions, the solutions also work for the 3-dimnsional incompressible Euler and Navier-Stokes equations.